Final answer:
The frictional force (X) is calculated to be approximately 15.3 N and the normal contact force on the box from the path is approximately 184.45 N by resolving forces and using Newton's second law.
Step-by-step explanation:
Calculating the Value of X and the Normal Contact Force on an Inclined Plane
To find the value of the frictional force (X) and the normal contact force, we can use Newton's second law and some trigonometry. The box is accelerated up an inclined plane, so the net force can be determined by the mass (12 kg) and the acceleration (1.75 m/s2). The pulling force is at an angle, which means we need to resolve it into parallel and perpendicular components to the incline.
First, let's find the parallel component of the pulling force (2X N) up the incline:
- 2X * cos(10°) - X - (mg sin(30°)) = mass * acceleration
- 2X * cos(10°) - X - (12 kg * 9.81 m/s2 * 0.5) = 12 kg * 1.75 m/s2
Solve for X, this will give us the frictional force:
- X ≈ 15.3 N (the force of friction)
Next, we can find the normal contact force exerted by the path:
- Normal force = 2X * sin(10°) + mg cos(30°)
- Normal force ≈ 184.45 N
The value of X is approximately 15.3 N and the normal contact force is approximately 184.45 N.